Each object is the n-fold monoidal product of the generating object \(1\).
To specify a prop \(P\) it is enough to specify 5 things (and check they satisfy the rules for symmetric monoidal categories):
A set \(\mathcal{C}(m,n))\) of morphisms \(m \rightarrow n\) for \(m,n \in \mathbb{N}\).
For all naturals, an identity map \(n \xrightarrow{id_n} n\)
For all \(m,n \in \mathbb{N}\), a symmetry map \(m+n \xrightarrow{\sigma_{m,n}} n+m\)
A composition rule: given \(m \xrightarrow f n\) and \(n \xrightarrow g p\), a map \(m \xrightarrow{f;g} p\)
A monoidal product on morphisms: given \(m \xrightarrow f m'\) and \(n \xrightarrow g n'\), a map \(m+n \xrightarrow{f+g} m' +n'\)
A prop
A symmetric strict monoidal category \((\mathcal{C}, 0,+)\) for which \(Ob(\mathcal{C})=\mathbb{N}\) and the monoidal product on objects is given by addition.
A \(\ref{Prop|\emph{prop|referenced}}\) functor \(\mathcal{C} \xrightarrow F \mathcal{D}\) A functor for which
\(\forall n \in \mathbb{N}: F(n)=n\)
For all \(m_1 \xrightarrow f m_2\) and \(n_1 \xrightarrow g n_2 \in \mathcal{C}\): \(F(f))+F(g)=F(f+g) \in \mathcal{D}\)
The prop FinSet
Morphisms \(m \xrightarrow f n\) are functions from \(\bar m\) to \(\bar n\).
The identities, symmetries, and composition rule are obvious.
The monoidal product on functions is given by the disjoint union.
The compact closed category \(\ref{Correl as CCC|\textbf{Corel|referenced}}\) is a prop.
There is a prop Rel
Morphisms are relations \(R \subseteq \bar m \times \bar n\)
Composition with \(S \subseteq \bar n \times \bar p\) is
\(\{(i, k)\ |\ \exists (i, j) \in R \land \exists (j,k) \in S\}\)
Monoidal product is given by the coproduct, which amounts to placing the two relations side-by-side.
The inclusion \(\mathbf{Bij} \overset{i}{\hookrightarrow} \mathbf{FinSet}\) is a prop functor.
There is a prop functor \(\mathbf{Bij} \xrightarrow F \mathbf{Rel_{Fin}}\) defined by \(F(\bar{m} \xrightarrow{f} \bar{n}):=\{(i,j)\ |\ f(i)=j\} \in \bar m \times \bar n\)
Draw a morphism \(3 \xrightarrow f 2\) and a morphism \(2 \xrightarrow g 4\) in \(\ref{FinSet as prop|\textbf{FinSet|referenced}}\)
Draw \(f+g\)
What is the natural composition rule for morphisms in \(\ref{FinSet as prop|\textbf{FinSet|referenced}}\)
What are the identities in \(\ref{FinSet as prop|\textbf{FinSet|referenced}}\)
Draw a symmetry map \(\sigma_{m,n}\) for some \(m,n\) in \(\ref{FinSet as prop|\textbf{FinSet|referenced}}\).
TODO
A posetal prop is a prop that is also a poset.
In other words, a symmetric monoidal preorder \((\mathbb{N}, \leq)\) for some posetal relation \(\leq\), where the monoidal product is addition.
Give three examples of a posetal prop.
The normal meaning of \(\leq\) as less than or equal to
The divisibility relation
The opposite of the first example (greater than or equal to).